Math 1312 Lesson 1: Sets, Statements, and Reasoning. A set is any collection of objects. These objects are called the elements of the set.
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1 Math 1312 Lesson 1: Sets, Statements, and Reasoning A set is any collection of objects. hese objects are called the elements of the set. A is a subset of B, if A is "contained" inside B, that is, all elements of A are also elements of B, in symbols,. A and B may coincide, i.e. be the same ( ). Example 1 A = {1, 2, 3} B = {Counting numbers} C = {Students enrolled in Math 1312} Set A has 3 elements all of which are also the elements of B, i.e. Elements common to A and B form the intersection of A and B, written as. he union of two sets is all elements that are in A or B, written. Example 2 X = {3, 19, 5, 7} Y = {20, 3, 8, 125, 19} A statement is a set of words or symbols that collectively make a claim that can be classified as true or false. Example 3 Classify the following as a true statement, false statement, or neither = 9 5 < 2 riangles have 3 sides. exas is the largest state in US. Watch out! An open statement is a statement which contains a variable and becomes either true or false depending on the value that replaces the variable. Example 4 x + 2 = 5 She is a good tennis player.
2 he negation of a statement P makes a claim opposite that of the original statement, written as. Example 5 Statement: All fish cam swim. Some fish cannot swim. Example 6 Write negations for the following statements. Determine the truth value of both, the statement and its negation. 1. Statement: A rectangle has 4 sides. 2. Statement: = 8 3. Statement: 4. Statement: All jokes are funny. A statement and its negation have OPPOSIE truth values! Example 7 Construct a truth table for the negation of P. P P We form a compound statement by combining simple statements. Let s use letters P and Q to represent two simple statements. Conjunction: P and Q Disjunction: P or Q A conjunction is RUE only if BOH P and Q are true. A disjunction is ALSE only if BOH P and Q are false.
3 Example 8 Complete the truth value tables for conjunction and disjunction of P and Q. P Q P and Q P Q P or Q Example 9 Conjunction or Disjunction? rue or alse? 1. riangles are square or circles are round. 2. riangles are round or circles are square < 1 and 5 < 7 4. riangles have 3 angles and = 5. Conditional statement is a compound statement If P, than Q. Here, P is called the hypothesis and Q is called the conclusion. If P, than Q can be expressed in the form All P are Q. Example If an animal is a fish, then it can swim. All fish can swim. 2. If a student is enrolled in this class, then she has to pay the tuition. All students enrolled in this class have to pay the tuition. Example 11 State the hypothesis and the conclusion. 1. All squares are rectangles. 2. You get an A in Math 1312 class if you study hard. Conditional statement is ALSE only if hypothesis is RUE but conclusion is ALSE.
4 Example 12 P Q If P, then Q Example 13 rue or alse? 1. If an animal is a fish, then it can swim = 7 if triangle has 4 angles. 3. If two lines intersect, then they intersect at a point. Reasoning is a process based on experience and principles that allow one to arrive at a conclusion. ypes of reasoning 1. Intuition is a way of thinking that draws conclusion from feelings and senses, not based on facts and evidence. 2. Induction is a way of reasoning that draws conclusions from a small number of observations. 3. Deduction is a formal argument that proves the tested theory. Example 14 his figure is a square. 1. What can you say about the lengths of the diagonals? 2. What type of reasoning are you using? Example 15 Mary submitted Quiz 1 and Quiz 2 on time. I think she will submit Quiz 3 before it expires. What type of reasoning is used? Example 16 If a student gets 95 in a test, then he gets an A. om got 95 in the test. 1. If you accept the above statements as true, what must you conclude? 2. What type of reasoning are you using?
5 Law of detachment: 1. If P, then Q 2. P Conclusion: Q Allows drawing logic conclusions Can check if an argument is valid Example 17 Is the following argument valid? 1. If it is raining, then om will stay at home. 2. It is raining Conclusion: om will stay at home. 1. If a man lives in Houston, then he lives in exas. 2. Mark lives in exas. Conclusion: Mark lives in Houston. Example 18 Use deduction to state a conclusion (if possible). 1. If a person attends a university, then he will be a success in life. 2. Sam attends University of Houston. Conclusion: 1. If you are a cat, than you can meow. 2. You can make a meow sound. Conclusion:
Read ahead and use your textbook to fill in the blanks. We will work the examples together.
Math 1312 Section 1.1 : Sets, Statements, and Reasoning Read ahead and use your textbook to fill in the blanks. We will work the examples together. A set is any. hese objects are called the of the set.
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